Conditional simulation of non-Gaussian random fields for earthquake monitoring systems
College
Engineering and Computer Science
Department
Ocean and Mechanical Engineering
Document Type
Article
Publication/Event/Conference Title
Chaos Solitons and Fractals
Publication Status
Version of Record
Abstract
The problem of conditional simulation of random fields gained a significant interest recently due to its applications to urban earthquake monitoring. In this paper, for the first time in the literature, the method of conditional simulation of non-Gaussian random fields is developed. It combines previous techniques of iterative procedure of unconditional simulation of non-Gaussian fields, and the procedure of conditional simulation of Gaussian random fields. To contrast the agreement between the simulated correlation function and targeted correlation function, the numerical error is decomposed into two parts, namely, into simulation error and mapping error. Simulation error can be reduced by increasing number of samples while mapping error is eliminated by the suitable iteration procedure. In this paper univariate and time-independent random fields are considered. Numerical example shows that the correlation structure and probability distribution of the simulated random field have excellent agreements with given correlation structure and probability distribution, respectively. © 1994.
First Page
91
Last Page
101
DOI
10.1016/0960-0779(94)00159-N
Publication Date
1-1-1995
Recommended Citation
Ren, Y. J.; Elishakoff, I.; and Shinozuka, M., "Conditional simulation of non-Gaussian random fields for earthquake monitoring systems" (1995). Faculty Scholarship. 550.
https://digitalcommons.fau.edu/faculty_papers/550